Coherent States and Generalized Hermite Polynomials for fractional statistics -- interpolating from fermions to bosons

Abstract

This article develops the algebraic structure that results from the θ-commutator α β - ei θ β α = 1 that provides a continuous interpolation between the Clifford and Heisenberg algebras. We first demonstrate the most general geometrical picture, applicable to all values of N. After listing the properties of this Hilbert space, we study the generalized coherent states that result when N=0, for N 2. We also solve the generalized harmonic oscillator problem and derive generalized versions of the Hermite polynomials for general N. Some remarks are made to connect this study to the case of anyons. This study represents the first steps towards developing an anyonic field theory.